New supersets of Zadoff-Chu sequences via the Weil bound
DOI10.1007/S12095-023-00632-8zbMATH Open1540.94052MaRDI QIDQ6542656
Yang Yang, Avik. R. Adhikary, Zhengchun Zhou, Shilu Liu
Publication date: 22 May 2024
Published in: Cryptography and Communications (Search for Journal in Brave)
exponential sumsWeil bound\(m\)-sequences\(p\)-phase sequencesZadoff-Chu sequencesbinary Gold sequenceslow correlation zonephysical random access channel (PRACH)
Algebraic coding theory; cryptography (number-theoretic aspects) (11T71) Shift register sequences and sequences over finite alphabets in information and communication theory (94A55) Communication theory (94A05)
Cites Work
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- New Polyphase Sequence Families With Low Correlation Derived From the Weil Bound of Exponential Sums
- The Finite Harmonic Oscillator and Its Applications to Sequences, Communication, and Radar
- Complex sequences with low periodic correlations (Corresp.)
- Lower bounds on the maximum cross correlation of signals (Corresp.)
- Generators and irreducible polynomials over finite fields
- Sequence Families With Low Correlation Derived From Multiplicative and Additive Characters
- Optimal binary sequences for spread spectrum multiplexing (Corresp.)
- Polyphase codes with good periodic correlation properties (Corresp.)
- On Some Exponential Sums
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